Matteo Poggi scite author profile

We present a complete two-loop analysis of the quantum expectation value for circular BPS Wilson loops in ABJ(M) theories. We examine in details the 1/2 BPS case, that requires non-trivial fermionic couplings with the contour, finding perfect agreement with the exact matrix model answer at zero framing. The result is obtained through a careful application of DRED regularization scheme, combined with a judicious rearrangement of the relevant perturbative contributions that reduces the computation to simple integrals. We carefully analyze the contribution of fermions that is crucial for the consistency with the localization procedure and point out the arising of pivotal evanescent terms, discussing their meaning in relation to Ward identities.

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Elliptic non-Abelian Donaldson-Thomas invariants of ℂ3

Benini

Bonelli

Poggi

et al. 2019

J. High Energ. Phys.

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We compute the elliptic genus of the D1/D7 brane system in flat space, finding a non-trivial dependence on the number of D7 branes, and provide an F-theory interpretation of the result. We show that the JK-residues contributing to the elliptic genus are in one-to-one correspondence with coloured plane partitions and that the elliptic genus can be written as a chiral correlator of vertex operators on the torus. We also study the quantum mechanical system describing D0/D6 bound states on a circle, which leads to a plethystic exponential formula that can be connected to the M-theory graviton index on a multi-Taub-NUT background. The formula is a conjectural expression for higher-rank equivariant K-theoretic Donaldson-Thomas invariants on C 3 . arXiv:1807.08482v3 [hep-th] 13 May 2019Besides the U(k) gauge symmetry, the theory has SU(N ) flavour symmetry acting on

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Elliptic genus derivation of 4d holomorphic blocks

Poggi

2018

J. High Energ. Phys.

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We study elliptic vortices on C × T 2 by considering the 2d quiver gauge theory describing their moduli spaces. The elliptic genus of these moduli spaces is the elliptic version of vortex partition function of the 4d theory. We focus on two examples: the first is a N = 1, U(N ) gauge theory with fundamental and anti-fundamental matter; the second is a N = 2, U(N ) gauge theory with matter in the fundamental representation. The results are instances of 4d "holomorphic blocks" into which partition functions on more complicated surfaces factorize. They can also be interpreted as free-field representations of elliptic Virasoro algebrae.

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Matteo Poggi

Perturbative evaluation of circular 1/2 BPS Wilson loops in $ \mathcal{N}=6 $ super Chern-Simons theories

Elliptic non-Abelian Donaldson-Thomas invariants of ℂ3

Elliptic genus derivation of 4d holomorphic blocks

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